题目内容
设Sn是正项数列{an}的前n项和,且Sn=
an2+
an-
.
(1)求a1的值;
(2)求数列{an}的通项公式;
(3)已知bn=2n,求Tn=a1b1+a2b2+…+anbn的值.
| 1 |
| 4 |
| 1 |
| 2 |
| 3 |
| 4 |
(1)求a1的值;
(2)求数列{an}的通项公式;
(3)已知bn=2n,求Tn=a1b1+a2b2+…+anbn的值.
分析:(1)在所给的等式中,令n=1时,即可求得a1的值.
(2)由4sn=an2+2an-3①,可得 4sn-1=
+2an-3 (n≥2)②,①-②化简可得an-an-1=2(n≥2),即数列{an}是以3为首项,2为公差之等差数列,由此求得通项公式.
(3)由bn=2n,可得Tn=3×21+5×22+…+(2n+1)•2n+0,用错位相减法求得它的值.
(2)由4sn=an2+2an-3①,可得 4sn-1=
| a | 2 n-1 |
(3)由bn=2n,可得Tn=3×21+5×22+…+(2n+1)•2n+0,用错位相减法求得它的值.
解答:解:(1)当n=1时,由条件可得 a1=s1=
+
a1-
,解出a1=3.
(2)又4sn=an2+2an-3①,可得 4sn-1=
+2an-3 (n≥2)②,
①-②4an=an2-
+2an-2an-1 ,即
-
-2(an+an-1)=0,
∴(
+an-1)(an-an-1-2)=0,
∵an+an-1>0,∴an-an-1=2(n≥2),
∴数列{an}是以3为首项,2为公差之等差数列,
∴an=3+2(n-1)=2n+1.
(3)由bn=2n,可得Tn=3×21+5×22+…+(2n+1)•2n+0③,
∴2Tn=0+3×22+…+(2n-1)•2n+(2n+1)2n+1 ④,
④-③可得 Tn=-3×21-2(22+23+…+2n)+(2n+1)2n+1=(2n-1)2n+1+2,
∴Tn=(2n-1)•2n+1+2.
| 1 |
| 4 |
| a | 2 1 |
| 1 |
| 2 |
| 3 |
| 4 |
(2)又4sn=an2+2an-3①,可得 4sn-1=
| a | 2 n-1 |
①-②4an=an2-
| a | 2 n-1 |
| a | 2 n |
| a | 2 n-1 |
∴(
| a | n |
∵an+an-1>0,∴an-an-1=2(n≥2),
∴数列{an}是以3为首项,2为公差之等差数列,
∴an=3+2(n-1)=2n+1.
(3)由bn=2n,可得Tn=3×21+5×22+…+(2n+1)•2n+0③,
∴2Tn=0+3×22+…+(2n-1)•2n+(2n+1)2n+1 ④,
④-③可得 Tn=-3×21-2(22+23+…+2n)+(2n+1)2n+1=(2n-1)2n+1+2,
∴Tn=(2n-1)•2n+1+2.
点评:本题主要考查数列的前n项和与第n项的关系,等差关系的确定,用错位相减法进行数列求和,属于中档题.
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